Redundancy of minimal weight expansions in Pisot bases

Abstract

Motivated by multiplication algorithms based on redundant number representations, we study representations of an integer n as a sum n=Σk εk Uk, where the digits εk are taken from a finite alphabet and (Uk)k is a linear recurrent sequence of Pisot type with U0=1. The most prominent example of a base sequence (Uk)k is the sequence of Fibonacci numbers. We prove that the representations of minimal weight Σk|εk| are recognised by a finite automaton and obtain an asymptotic formula for the average number of representations of minimal weight. Furthermore, we relate the maximal order of magnitude of the number of representations of a given integer to the joint spectral radius of a certain set of matrices.